On the Planar Edge-Length Ratio of Planar Graphs

August 09, 2019 Β· Declared Dead Β· πŸ› Journal of Computational Geometry

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Authors Manuel Borrazzo, Fabrizio Frati arXiv ID 1908.03586 Category cs.DS: Data Structures & Algorithms Cross-listed cs.CG, math.CO Citations 5 Venue Journal of Computational Geometry Last Checked 4 months ago
Abstract
The edge-length ratio of a straight-line drawing of a graph is the ratio between the lengths of the longest and of the shortest edge in the drawing. The planar edge-length ratio of a planar graph is the minimum edge-length ratio of any planar straight-line drawing of the graph. In this paper, we study the planar edge-length ratio of planar graphs. We prove that there exist $n$-vertex planar graphs whose planar edge-length ratio is in $Ξ©(n)$; this bound is tight. We also prove upper bounds on the planar edge-length ratio of several families of planar graphs, including series-parallel graphs and bipartite planar graphs.
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